How do you find the derivative of $y = \frac{3}{{(2 x)}^{3}}$ $y=3/(2x)^3$ ?

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How do you find the derivative of $y = \frac{3}{{(2 x)}^{3}}$ $y=3/(2x)^3$ ?

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Answer 1 · 2017-11-29T05:18:13

$- \frac{9}{8} x^{- 4} or - \frac{9}{8 x^{4}}$ $-9/8x^-4 or -9/(8x^4)$

Explanation:

First of all, let's simplify the fraction to $\frac{3}{8 x^{3}}$ $3/(8x^3)$ .
Two options:

Use quotient rule
Use power rule (easier)

Using the Quotient Rule

In case you didn't know, if $y = \frac{f (x)}{g (x)}$ $y = f(x)/g(x)$ , then
$dy/dx = (f'(x)g(x) - g'(x)f(x))/(g(x)^2)$
In this case, $f(x) = 3$ and $g(x) = 8x^3$ . Therefore,
$dy/dx = ([3]' * (8x^3) - [8x^3]' * 3)/(8x^3)^2$ .
$= (0 * (8x^3) - [8x^3]' * 3)/(8x^3)^2$ (because $[3]' = 0$ )
$= (-[8x^3]' * 3)/(8x^3)^2$
$= (-24x^2 * 3)/(8x^3)^2$ (because $[8x^3]' = 24x^2$ )
$= (-72x^2)/(64x^6)$ (simplifying)
$= (-9x^2)/(8x^6)$ (reducing)
$= -9/(8x^4)$ (reducing exponents)

That is one way of doing it, but it's kind of hard. There is a simpler way of doing it.

Using the Power Rule

$y = 3/(8x)^3 = 3/8x^(-3)$
In case you didn't know, if $y = x^n$ , then $dy/dx = n * x^(n-1)$ . Therefore,
$dy/dx = 3/8 * (-3) * x^(-3-1)$
$= -9/8 * x^(-4)$
$= -9/(8x^4)$

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How do you find the derivative of $y = \frac{3}{{(2 x)}^{3}}$ $y=3/(2x)^3$ ?

1 Answer

Explanation:

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How do you find the derivative of $y = \frac{3}{{(2 x)}^{3}}$ $y=3/(2x)^3$ ?